Add to ORKGWe consider a generalization of the vertex weighted online bipartite matching problem where the offline vertices, called resources, are reusable. In particular, when a resource is matched it is unavailable for a deterministic time duration $d$ after which it becomes available for a re-match. Thus, a resource can be matched to many different online vertices over a period of time. While recent work on the problem has resolved the asymptotic case where we have large starting inventory (i.e., many copies) of every resource, we consider the (more general) case of unit inventory and give the first algorithm that is provably better than the na\"ive greedy approach which has a competitive ratio of (exactly) 0.5. In particular, we achieve a competit...
In online minimum cost matching on the line, n requests appear one by one and have to be matched imm...
Bipartite matching markets pair agents on one side of a market with agents, items, or contracts on t...
We study the average performance of online greedy matching algorithms on G(n, n, p), the random bipa...
We consider the problem of online allocation (matching, budgeted allocations, and assortments) of re...
We study the b-matching problem, which generalizes classical online matching introduced by Karp, Vaz...
In an online problem, the input is revealed one piece at a time. In every time step, the online algo...
We introduce a weighted version of the ranking algorithm by Karp et al. (STOC 1990), and prove a com...
We study a weighted online bipartite matching problem: G(V1, V2, E) is a weighted bipartite graph wh...
AbstractIn the following paper an alternative online variant of the matching problem in bipartite gr...
In this paper we prove the efficacy of a simple greedy algorithm for a finite horizon online resourc...
The problem of online matching with stochastic rewards is a generalization of the online bipartite m...
Abstract. We consider the online bottleneck matching problem, where k server-vertices lie in a metri...
We study the online maximum matching problem in a model in which the edges are associated with a kno...
We study the b-matching problem in bipartite graphs G = (S,R,E). Each vertex s ? S is a server with ...
The online bipartite matching problem has offline buyers desiring to be matched to online items. The...
In online minimum cost matching on the line, n requests appear one by one and have to be matched imm...
Bipartite matching markets pair agents on one side of a market with agents, items, or contracts on t...
We study the average performance of online greedy matching algorithms on G(n, n, p), the random bipa...
We consider the problem of online allocation (matching, budgeted allocations, and assortments) of re...
We study the b-matching problem, which generalizes classical online matching introduced by Karp, Vaz...
In an online problem, the input is revealed one piece at a time. In every time step, the online algo...
We introduce a weighted version of the ranking algorithm by Karp et al. (STOC 1990), and prove a com...
We study a weighted online bipartite matching problem: G(V1, V2, E) is a weighted bipartite graph wh...
AbstractIn the following paper an alternative online variant of the matching problem in bipartite gr...
In this paper we prove the efficacy of a simple greedy algorithm for a finite horizon online resourc...
The problem of online matching with stochastic rewards is a generalization of the online bipartite m...
Abstract. We consider the online bottleneck matching problem, where k server-vertices lie in a metri...
We study the online maximum matching problem in a model in which the edges are associated with a kno...
We study the b-matching problem in bipartite graphs G = (S,R,E). Each vertex s ? S is a server with ...
The online bipartite matching problem has offline buyers desiring to be matched to online items. The...
In online minimum cost matching on the line, n requests appear one by one and have to be matched imm...
Bipartite matching markets pair agents on one side of a market with agents, items, or contracts on t...
We study the average performance of online greedy matching algorithms on G(n, n, p), the random bipa...